Abstract
We solve an interpolation problem in $$A^p_\alpha $$ involving specifying a set of (possibly not distinct) n points, where the $$k{\text {th}}$$ derivative at the $$k{\text {th}}$$ point is up to a constant as large as possible for functions of unit norm. The solution obtained has norm bounded by a constant independent of the points chosen. As a direct application, we obtain a characterization of the order-boundedness of a sum of products of weighted composition and differentiation operators acting between weighted Bergman spaces. We also characterize the compactness of such operators that map a weighted Bergman space into the space of bounded analytic functions.
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